Wronskiaan van $$$x$$$, $$$x^{5}$$$

Bereken de Wronskiaan van $$$\left\{f_{1} = x, f_{2} = x^{5}\right\}$$$.

De Wronskiaan wordt gegeven door de volgende determinant: $$$W{\left(f_{1},f_{2} \right)}\left(x\right) = \left|\begin{array}{cc}f_{1}\left(x\right) & f_{2}\left(x\right)\\f_{1}^{\prime}\left(x\right) & f_{2}^{\prime}\left(x\right)\end{array}\right|.$$$

In ons geval geldt $$$W{\left(f_{1},f_{2} \right)}\left(x\right) = \left|\begin{array}{cc}x & x^{5}\\\left(x\right)^{\prime } & \left(x^{5}\right)^{\prime }\end{array}\right|.$$$

Bepaal de afgeleiden (voor de stappen, zie afgeleiderekenmachine): $$$W{\left(f_{1},f_{2} \right)}\left(x\right) = \left|\begin{array}{cc}x & x^{5}\\1 & 5 x^{4}\end{array}\right|$$$.

Bereken de determinant (voor de stappen, zie determinant calculator): $$$\left|\begin{array}{cc}x & x^{5}\\1 & 5 x^{4}\end{array}\right| = 4 x^{5}$$$.

De Wronskiaan is gelijk aan $$$4 x^{5}$$$A.